InterviewSolution
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InterviewSolution
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One mole of a monatomic ideal gas is taken along two cyclic processes `E to F to G to E and E to F to H to E` as shown in the PV diagram. The processes involved are purely isochoric , isobaric , isothermal or adiabatic . Match the paths in List I with the magnitudes of the work done in List II and select the correct answer using the codes given below the lists. A. `{:(P,Q,R,S),(4,3,2,1):}`B. `{:(P,Q,R,S),(4,3,1,2):}`C. `{:(P,Q,R,S),(3,1,2,4):}`D. `{:(P,Q,R,S),(3,1,2,4):}` |
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Answer» Correct Answer - A Process `FG` is isothermal so work done =`nRT "In"((P_(t))/(P_(f))) = 32 P_(0)V_(0) "In" ((32P_(0))/(P_(0)))= 160 P_(0)V_(0) "In"2`. Process `GE` is isobaric So work done = `P|DeltaV| = P_(0)|(V_(G)- V_(E))|` =`P_(0)|(32V_(0) - V_(0))|` =`31P_(0)V_(0)` Process `FH` is adiabatic so `(32P_(0))V_(0)^(5//3) = (P_(0))V_(H)^(5//3) implies V_(H) = 8V_(0)` Since process `FH` is adiabatic so `|((P_(H)V_(H) - P_(F)V_(F)))/((8-1))|= (|(P_(0)8V_(0))-32P_(0)V_(0)|)/(((5)/(3)-1))=36P_(0)V_(0)` Process `G rarr H` is isobaric so work done =`P_(0)|(32V_(0)- 8V_(0))| = 24 P_(0)V_(0)` |
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